On the K\"ahler structures over Quot schemes
Abstract
Let Sn(X) be the n-fold symmetric product of a compact connected Riemann surface X of genus g and gonality d. We prove that Sn(X) admits a K\"ahler structure such that all the holomorphic bisectional curvatures are nonpositive if and only if n < d. Let QX(r,n) be the Quot scheme parametrizing the torsion quotients of O rX of degree n. If g ≥ 2 and n ≤ 2g-2, we prove that QX(r,n) does not admit a K\"ahler structure such that all the holomorphic bisectional curvatures are nonnegative.
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